Constructing sparsest -hamiltonian saturated k-uniform hypergraphs for a wide range of

Abstract

Given k3 and 1≤ < k, an (,k)-cycle is one in which consecutive edges, each of size k, overlap in exactly vertices. We study the smallest number of edges in k-uniform n-vertex hypergraphs which do not contain hamiltonian (,k)-cycles, but once a new edge is added, such a cycle is promptly created. It has been conjectured that this number is of order n and confirmed for ∈\1,k/2,k-1\, as well as for the upper range 0.8k≤ ≤ k-1. Here we extend the validity of this conjecture to the lower-middle range (k-1)/3<(k-1)/2.